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  <a href="http://sudopedia.enjoysudoku.com/Sue_de_Coq.html">Sue de Coq</a>
  <p>
   Almost Almost Locked Sets (AALS) are groups of N cells in a single house with N+2 candidates (e.g. 3 cells with 5 candidates).<br>
   The intersection of <b>{8}</b> and <b>{9}</b> is an <a href="http://sudopedia.enjoysudoku.com/Almost_ALS.html">Almost ALS</a> because it has {10} values in {11} cells.<br>
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  <p>
   The bivalue <b>cell {1}</b> in <b>{8}</b> must contain either <b>{3} or {4}</b> eliminating one of these candidates from the AALS (the intersection of the two regions) while 
   the bivalue <b>cell {2}</b> in <b>{9}</b> must contain either <b>{5} or {6}</b> eliminating another candidate thus turning the AALS into a
    <a href="http://sudopedia.enjoysudoku.com/Subset.html">Locked Set</a> with the values <b>{7}({3} or {4}), ({5} or {6})</b>.<br>
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  <p>
   Because the values <b>{7}{3} and {4}</b> in <b>{8}</b> must be either in <b>cell {1}</b> or in the intersection
    they can be eliminated as candidates from all other cells in that region.<br>
   Because the values <b>{7}{5} and {6}</b> in <b>{9}</b> must be either in <b>cell {2}</b> or in the intersection
    they can be eliminated as candidates from all other cells in that region.<br>
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